Litcius/Paper detail

Moduli-dependent species scale

Damian van de Heisteeg, Cumrun Vafa, Max Wiesner, David Wu

2024Beijing Journal of Pure and Applied Mathematics51 citationsDOIOpen Access PDF

Abstract

The counting of the number of light modes in a gravitational theory is captured by the notion of the 'species scale', which serves as an effective UV cutoff below the Planck scale.We propose to define a moduli-dependent species scale in the context of 4d, N = 2 theories, using the one loop topological free energy F 1 , which we relate to a gravitational version of the a-function.This leads to Λ sp ∼ 1 √F 1 from which we recover the expected scaling of the species scale in various corners of the moduli space.Moreover by minimizing F 1 we define the center of the moduli space (the 'desert point') as a point where the species scale is maximal.At this point the number of light degrees of freedom is minimized.

Topics & Concepts

ModuliScale (ratio)MathematicsBiological systemEnvironmental scienceBiologyGeographyPhysicsCartographyQuantum mechanicsMosquito-borne diseases and controlPlant Virus Research Studies
Moduli-dependent species scale | Litcius